| Id | Town | Player | X | Y | Town score ▾ | Player score | Ally | Distance |
| 32269 | L45l02-01 Hawaii  | Jean de Luca | 479 | 524 | 5077 | 39061 | --- | 31.9 |
| 33554 | L45l03 Austrias Best | Jean de Luca | 478 | 527 | 5148 | 39061 | --- | 34.8 |
| 30906 | L45l01 | Jean de Luca | 489 | 524 | 6622 | 39061 | --- | 26.4 |
| 3305 | 44 Muspelheim | Saftsocke | 491 | 492 | 12027 | 164845 | Nordic Vikings | 12.0 |
| 8939 | 51. Kairo | Saftsocke | 482 | 512 | 12874 | 164845 | Nordic Vikings | 21.6 |
| 771 | Langsam 44M  | Renakes | 492 | 482 | 14464 | 133426 | Nordic Vikings | 19.7 |
| 655 | JeBoude 44 | Renakes | 493 | 473 | 14716 | 133426 | Nordic Vikings | 27.9 |
Players list: Jean de Luca; Saftsocke; Renakes
BBCode:
[town]32269[/town] 5077pts [player]Jean de Luca[/player] 479/524 31.9
[town]33554[/town] 5148pts [player]Jean de Luca[/player] 478/527 34.8
[town]30906[/town] 6622pts [player]Jean de Luca[/player] 489/524 26.4
[town]3305[/town] 12027pts [player]Saftsocke[/player] 491/492 12.0
[town]8939[/town] 12874pts [player]Saftsocke[/player] 482/512 21.6
[town]771[/town] 14464pts [player]Renakes[/player] 492/482 19.7
[town]655[/town] 14716pts [player]Renakes[/player] 493/473 27.9
[town]32269[/town] 5077pts [player]Jean de Luca[/player] 479/524 31.9
[town]33554[/town] 5148pts [player]Jean de Luca[/player] 478/527 34.8
[town]30906[/town] 6622pts [player]Jean de Luca[/player] 489/524 26.4
[town]3305[/town] 12027pts [player]Saftsocke[/player] 491/492 12.0
[town]8939[/town] 12874pts [player]Saftsocke[/player] 482/512 21.6
[town]771[/town] 14464pts [player]Renakes[/player] 492/482 19.7
[town]655[/town] 14716pts [player]Renakes[/player] 493/473 27.9
= This player has only one town so his academy might not be well developed.
= This player has lost some points during the last week and may be inactive.
= This player is inactive or in vacation mode.
Note: The "radius" of search is "square", so if X = 400 and Y = 500, for a radius of 10, the search will take place in a square area with X between 390 and 410 and Y between 490 and 510. Consequently, a radius of 50, covers a whole sea.